An ideal gas is expanded adiabatically at an initial temperature of 300 K so that its volume is doubled. The final temperature of the hydrogen gas is `lambda=1.40)`

The work done by one mole of a monatomic ideal gas ( gamma = 5 //3 ) in expanding adiabatically is 825 J . The initial temperature and volume of the gas are 393 K and 0.100 m^3 obtain the final temperature of the gas .

I mole of an ideal monoatomic gas is expanded till the temperature of the gas is doubled under the process V^(2)T=contant . The initial temperature of the gas is 400K . In terms of R find total work done in the process.

One mole of an ideal gas (C_(v,m)=(5)/(2)R) at 300 K and 5 atm is expanded adiabatically to a final pressure of 2 atm against a constant pressure of 2 atm. Final temperature of the gas is :

An ideal monoatomic gas at 300 K expands adiabatically to twice its volume. The final temperature of gas is

One mole of a ideal gas (C_(v,m)=5/2R) at 300 K and 5 at m is expanded adiabatically to a final pressure of 2 atm against a constant pressure of 2 atm. Final temperature of the gas is:

One mole of an ideal gas (C_(vn)= (5)/(2)R) at 300 K and 5 atm is expanded adiabatically to a final pressure of 2 atm against a constant pressure of 2 atm. Final temperature of the gas is:

One mole of an ideal gas (C_(v,m)=(5)/(2)R) at 300 K and 5 atm is expanded adiabatically to a final pressure of 2 atm against a constant pressure of 2 atm. Final temperature of the gas :